Ring Theory Antwerp 1980
Ring Theory Antwerp 1980 Proceedings, University of Antwerp U.I.A. Antwerp, Belgium, May 6–9, 1980 / [electronic resource] :
edited by F. van Oystaeyen.
- X, 214 p. online resource.
- Lecture Notes in Mathematics, 825 0075-8434 ; .
- Lecture Notes in Mathematics, 825 .
Normalizing extensions I -- Normalizing extensions II -- Commutant des Modules de Longueur Finie sur Certaines Algèbres Filtrées -- Maximal orders applied to enveloping algebras -- Fxtensions of valuations on skew fields -- Extensions of simple by simple unit-regular rings -- Invertible 2×2 matrices over skew polynomial rings -- Hereditary P. I. algebras -- Grade et Théorème d’intersection en algèbre Non commutative -- Théorème de Hopkins pour les Catégories de Grothendieck -- The moore-penrose inverse for matrices over skew polynomial rings -- The lattice type of orders: A diagrammatic approach. I -- Arithmetically graded rings .I. -- Radicals and chain conditions -- Graded azumaya algebras and brauer groups -- Birationality of P.I. rings and non-commutative varieties -- Skew power series rings and some homological properties of filtered rings.
9783540383345
10.1007/BFb0089114 doi
Algebra.
Algebra.
QA150-272
512
Normalizing extensions I -- Normalizing extensions II -- Commutant des Modules de Longueur Finie sur Certaines Algèbres Filtrées -- Maximal orders applied to enveloping algebras -- Fxtensions of valuations on skew fields -- Extensions of simple by simple unit-regular rings -- Invertible 2×2 matrices over skew polynomial rings -- Hereditary P. I. algebras -- Grade et Théorème d’intersection en algèbre Non commutative -- Théorème de Hopkins pour les Catégories de Grothendieck -- The moore-penrose inverse for matrices over skew polynomial rings -- The lattice type of orders: A diagrammatic approach. I -- Arithmetically graded rings .I. -- Radicals and chain conditions -- Graded azumaya algebras and brauer groups -- Birationality of P.I. rings and non-commutative varieties -- Skew power series rings and some homological properties of filtered rings.
9783540383345
10.1007/BFb0089114 doi
Algebra.
Algebra.
QA150-272
512